Mathematics (Apr 2019)

The Bounds of Vertex Padmakar–Ivan Index on <i>k</i>-Trees

  • Shaohui Wang,
  • Zehui Shao,
  • Jia-Bao Liu,
  • Bing Wei

DOI
https://doi.org/10.3390/math7040324
Journal volume & issue
Vol. 7, no. 4
p. 324

Abstract

Read online

The Padmakar–Ivan ( P I ) index is a distance-based topological index and a molecular structure descriptor, which is the sum of the number of vertices over all edges u v of a graph such that these vertices are not equidistant from u and v. In this paper, we explore the results of P I -indices from trees to recursively clustered trees, the k-trees. Exact sharp upper bounds of PI indices on k-trees are obtained by the recursive relationships, and the corresponding extremal graphs are given. In addition, we determine the P I -values on some classes of k-trees and compare them, and our results extend and enrich some known conclusions.

Keywords